Please use this identifier to cite or link to this item: http://ir.library.ui.edu.ng/handle/123456789/7656
Title: Estimating seemingly unrelated regressions with first order autoregressive disturbances
Authors: Olamide, E. I.
Adepoju, A. A.
Keywords: Autocorrelation
Feasible generalized least squares
Generalized least squares
Iterative ordinary least squares
Monte Carlo
Prais- Winsten transformation
Seemingly unrelated regressions
Issue Date: May-2013
Publisher: CSCanada
Abstract: In Seemingly Unrelated Regressions (SUR) model, disturbances are assumed to be correlated across equations and it will be erroneous to assume that disturbances behave independently, hence, the need for an efficient estimator. Literature has revealed gain in efficiencyof the SUR estimator over the Ordinary Least Squares (OLS) estimator when the errors are correlated across equations. This work, however, considers methods of estimating a set of regression equations when disturbances are both contemporaneously and serially correlated. The Feasible Generalized Least Squares (FGLS), OLS and Iterative Ordinary Least Squares (IOLS) estimation techniques were considered and the form of autocorrelation examined. Prais-Winstein transformation was conducted on simulated data for the different sample sizes used to remove autocorrelations. Results from simulation studies showed that the FGLS was efficient both in small samples and large samples. Comparative performances of the estimators were investigated on the basis of the standard errors of the parameter estimates when estimating the model with and without AR(1) and the results showed that the estimators performed better with AR(1) as the sample size increased especially from 20. On the criterion of the Root Mean Square, the FGLS was found to have performed better with AR(1) and it was revealed that bias reduces as sample size increases. In all cases considered, the SUR estimator performed best. It was consistently most efficient than the OLS and IOLS estimators
URI: http://ir.library.ui.edu.ng/handle/123456789/7656
ISSN: 1923-8452
Studies in Mathematical Sciences 6(2), 2013. Pp. 40 - 57
Appears in Collections:Scholarly works

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